Question
The point P (-1,2) is rotated to become P′
(2,1). Describe the rotation by degree and direction.
(1 point)
Responses
180° rotation
180° rotation
90° rotation
90° rotation
−270° rotation
−270° rotation
−90° rotation
(2,1). Describe the rotation by degree and direction.
(1 point)
Responses
180° rotation
180° rotation
90° rotation
90° rotation
−270° rotation
−270° rotation
−90° rotation
Answers
GPT-4o mini
To determine the rotation that transforms point P (-1, 2) to point P' (2, 1), we can analyze the changes in the coordinates.
1. **Initial Position**: P (-1, 2)
2. **Final Position**: P' (2, 1)
Now, let’s examine the transformation:
- The x-coordinate changes from -1 to 2, which is an increase of 3.
- The y-coordinate changes from 2 to 1, which is a decrease of 1.
The transformation can be visualized by plotting these points on a Cartesian plane.
Next, we'll check for potential rotations around the origin:
### 180° Rotation
A 180° rotation around the origin switches the signs of both coordinates:
- P (x, y) -> P' (-x, -y)
Applying to P:
- P( -1, 2 ) rotates to P' (1, -2), which is incorrect.
### 90° Rotation
A 90° rotation around the origin would transform the coordinates as follows:
- P (x, y) -> P' (-y, x)
Applying to P:
- P( -1, 2 ) rotates to ( -2, -1), which is incorrect.
### -90° Rotation
A -90° rotation (or a clockwise rotation) transforms the coordinates as follows:
- P (x, y) -> P' (y, -x)
Applying to P:
- P( -1, 2 ) rotates to ( 2, 1), which matches P'.
### −270° Rotation
A -270° rotation (or a +90° rotation) would be:
- P (x, y) -> P' (-y, x)
Applying to P:
- P( -1, 2 ) rotates to ( -2, -1), which is incorrect.
Based on the analysis above, the correct transformation is a **−90° rotation**.
So the answer is **−90° rotation**.
1. **Initial Position**: P (-1, 2)
2. **Final Position**: P' (2, 1)
Now, let’s examine the transformation:
- The x-coordinate changes from -1 to 2, which is an increase of 3.
- The y-coordinate changes from 2 to 1, which is a decrease of 1.
The transformation can be visualized by plotting these points on a Cartesian plane.
Next, we'll check for potential rotations around the origin:
### 180° Rotation
A 180° rotation around the origin switches the signs of both coordinates:
- P (x, y) -> P' (-x, -y)
Applying to P:
- P( -1, 2 ) rotates to P' (1, -2), which is incorrect.
### 90° Rotation
A 90° rotation around the origin would transform the coordinates as follows:
- P (x, y) -> P' (-y, x)
Applying to P:
- P( -1, 2 ) rotates to ( -2, -1), which is incorrect.
### -90° Rotation
A -90° rotation (or a clockwise rotation) transforms the coordinates as follows:
- P (x, y) -> P' (y, -x)
Applying to P:
- P( -1, 2 ) rotates to ( 2, 1), which matches P'.
### −270° Rotation
A -270° rotation (or a +90° rotation) would be:
- P (x, y) -> P' (-y, x)
Applying to P:
- P( -1, 2 ) rotates to ( -2, -1), which is incorrect.
Based on the analysis above, the correct transformation is a **−90° rotation**.
So the answer is **−90° rotation**.